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Robust adaptive Lasso for variable selection

Author

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  • Qi Zheng
  • Colin Gallagher
  • K. B. Kulasekera

Abstract

The adaptive least absolute shrinkage and selection operator (Lasso) and least absolute deviation (LAD)-Lasso are two attractive shrinkage methods for simultaneous variable selection and regression parameter estimation. While the adaptive Lasso is efficient for small magnitude errors, LAD-Lasso is robust against heavy-tailed errors and severe outliers. In this article, we consider a data-driven convex combination of these two modern procedures to produce a robust adaptive Lasso, which not only enjoys the oracle properties, but synthesizes the advantages of the adaptive Lasso and LAD-Lasso. It fully adapts to different error structures including the infinite variance case and automatically chooses the optimal weight to achieve both robustness and high efficiency. Extensive simulation studies demonstrate a good finite sample performance of the robust adaptive Lasso. Two data sets are analyzed to illustrate the practical use of the procedure.

Suggested Citation

  • Qi Zheng & Colin Gallagher & K. B. Kulasekera, 2017. "Robust adaptive Lasso for variable selection," Communications in Statistics - Theory and Methods, Taylor & Francis Journals, vol. 46(9), pages 4642-4659, May.
  • Handle: RePEc:taf:lstaxx:v:46:y:2017:i:9:p:4642-4659
    DOI: 10.1080/03610926.2015.1019138
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    Cited by:

    1. Yeşim Güney & Yetkin Tuaç & Şenay Özdemir & Olcay Arslan, 2021. "Robust estimation and variable selection in heteroscedastic regression model using least favorable distribution," Computational Statistics, Springer, vol. 36(2), pages 805-827, June.

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